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The transition to instability in weakly non-uniform flows without dissipation. (English. Russian original) Zbl 0899.76151
J. Appl. Math. Mech. 60, No. 3, 429-432 (1996); translation from Prikl. Mat. Mekh. 60, No. 3, 433-437 (1996).

MSC:
76E05 Parallel shear flows in hydrodynamic stability
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[1] Dodd, R.; Eilbek, J.; Gibbon, J.; Morris, H., Solitons and non-linear wave equations, (1988), Mir Moscow
[2] Lifshits, Ye.M.; Pitayevskii, L.E., ()
[3] Akhiyezer, A.I.; Polovin, R.V., The criteria for wave growth, Uspekhi fiz. nauk, 104, 2, 185-200, (1971)
[4] Iordanskii, S.V., The stability of non-uniform states and continual integrals, Zh. eksp. teor fiz., 94, 7, 180-189, (1988)
[5] Huerre, E.; Monkewitz, E.A., Local and global instabilities in spatially developing flows, (), 473-537
[6] Chomaz, J.-M.; Huerre, E.; Redekopp, L.G., A frequency selection criterion in spatially developing flows, Stud. appl. math., 84, 2, 119-144, (1991) · Zbl 0716.76041
[7] Zaslavskii, G.M.; Meitlis, V.E.; Filonenko, N.N., The interaction of waves in inhomogeneous media, (1982), Nauka Novosibirsk
[8] Ruzhadze, A.A.; Silin, V.P., The method of geometrical optics in the elearo-dynamics of an ihomogeneous plasma, Uspekhi fiz. nauk, 82, 3, 499-535, (1964)
[9] Maslov, V.P., The theory of perturbations and asymptotic methods, (1965), Izd. Mosk. Gos. Univ Moscow
[10] Kuljkovskii, A.G., On the stability loss of weakly non-uniform flows in emended regions. the formation of transverse oscillations of a tube conveying a fluid, Prikl. mat. mekh., 57, 5, 93-99, (1993)
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